Relations on Mg,n and the negative r-spin Witten conjecture
Abstract
We construct and study various properties of a negative spin version of the Witten r -spin class. By taking the top Chern class of a certain vector bundle on the moduli space of twisted spin curves that parametrises r -th roots of the anticanonical bundle, we construct a non-semisimple cohomological field theory (CohFT) that we call the Theta class r . This CohFT does not have a flat unit and its associated Dubrovin--Frobenius manifold is nowhere semisimple. Despite this, we construct a semisimple deformation of the Theta class, and using the Teleman reconstruction theorem, we obtain tautological relations on Mg,n . We further consider the descendant potential of the Theta class and prove that it is the unique solution to a set of W -algebra constraints, which implies a recursive formula for the descendant integrals. Using this result for r = 2 , we prove Norbury's conjecture which states that the descendant potential of 2 coincides with the Br\'ezin--Gross--Witten tau function of the KdV hierarchy. Furthermore, we conjecture that the descendant potential of r is the r -BGW tau function of the r -KdV hierarchy and prove the conjecture for r = 3 .
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